http://journal.uir.ac.id/index.php/JGEET 
 

 
 

E-ISSN : 2541-5794  
   P-ISSN : 2503-216X  

Journal of Geoscience,  
Engineering, Environment, and Technology 

Special Vol 04 No 02-2 2019 

 

 
Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019  19 

 

SPECIAL VOLUME 
 

Geometric and strain analyses in folds of the area around 
Gankot, district Pithoragarh, Uttarakhand, India 

Swati Lata
1
*, Ravindra Kumar

2
, Vaibhava Srivastava

1
 

1
Banaras Hindu University, Center of Advanced Study, Department of Geology, Varanasi, -221005, India  

2
Babasaheb Bhimrao Ambedkar University, Department of Earth Sciences, Lucknow, -226025, India 

 
* Corresponding author : swatilata4@gmail.com 
Received: Oct 17, 2018; Accepted: Feb 22, 2019. 

DOI: 10.25299/jgeet.2019.4.2-2.2237 

 
 
Abstract 

The study area around Gankot in Pithoragarh district of Uttarakhand belongs to the Thalkedar Limestone unit of Mandhali 
Formation, Tejam Group in Inner Sedimentary Zone of Lesser Himalaya, which exposes complexly folded and refolded 
structures. Geometric analysis carried out on the profile section of the fold tracing using dip isogon and orthogonal thickness 
parameters revealed presence of all the fold geometry suggested by Ramsay (1967) however the class 3 followed by class 1B 
are the most dominant classes in the study area when individual layers of the fold were studied. The study of folds as 
multilayered unit reveals that folds in study area belong to strongly non-analogous fold class of anisodeviatoric folds. In fold, 
the strain analysis has been done by drawing strain ellipse obtained by Inverse Thickness Method which is useful in estimating 

-dimensional flattening 
strain ratio (Rs) value ranged between 1 and 3.14 with an average Rs value of 1.60. The method of Srivastava and Gairola 
(2003) has also been used to obtain shear strain and flattening strain for the multilayered folds of study area. The results reveal 
that the multilayered folds around Gankot area are moderately flattened with mean flattening strain varying between 1.06 and 
2.28. A very high degree of variation in shearing ranging about 70o in both clockwise and anticlockwise directions has been 
noticed. The shear strains (γ) in folds have been found to vary between -2.75 to + 3.27 with an average of +0.33. The shearing 
and strain patterns are suggestive that the most dominant folding mechanism has been the flexure-shear for the folds of the 
study area which are overprinted by the fold flattening and other subsequent deformations. 
 
Keywords: Fold geometry, Strain, Flattening, Shearing, Lesser Himalaya, Multilayered fold 
 

 

1. Introduction  

The folded layer may or may not maintain uniform thickness across the full profile view of the fold. The 
variation of fold geometry within a rock layer during folding depends on the internal stresses it is forced to bear 

- which 
are the lines obtained by connecting points of equal inclination on the outer and inner bounding surfaces of the 

α -the 
α -the axial plane parallel thickness parameter in the folded layers and 

developed a scheme of fold classification based on variations in these thickness parameters with respect to dip 
angle α. Based on the pattern of variation Ramsay (1967) and Ramsay and Huber (1987) classified fold layer 
geometry as class 1A, 1B, 1C, 2 and 3. Later Zagorčev (1993) extended the fold class to include further more 
categories as 1A1, 1A2, 1A3, 3A, 3B and 3C classes in 1A and 3 classes respectively. These classification schemes 
hold good to describe the geometry in a single layer of the fold. In nature however, most of the folds occur as 
multilayered sequence. In field the folds may or may not exhibit simplicity due to variations in the amount and 
direction of applied stresses, composition, viscosity, porosity, shape and size of grains in different layers, thus the 
variety of intermediate fold types are found. To describe the degree of variation in the geometry of constituents 
layers in multilayered fold a few schemes of classification exclusively for multilayered folds, were developed by 
Srivastava and Gairola (1997, 1999, and 2003). The study of geometry of the folds is often useful in interpreting 
the mechanism of fold development in a region. Therefore, in present work the geometry of folds in Mandhali 
Formation around Gankot village (Fig.1) of Pithoragarh district of Lesser Kumaon Himalaya have been studied to 
know about the possible fold development mechanism which might be significant in deducing the overall 
tectonic history of the area. In this work the analysis of the fold have also been done to obtain the flattening 
strain too by using method of Srivastava and Gairola (2003). 

 

http://journal.uir.ac.id/index.php/JGEET


 
20  Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019  
 

 

Fig. 1. Location of study area around Gankot in the geological map of a part of Kumaon Himalaya (after Valdiya 1980). 

 

2. Geology of the area 

There has been significant contributions on the geology of Kumaon Himalaya by workers like Rupke (1974), 
Valdiya (1980) , Chamyal (1991), Azmi and Paul (2004), Tiwari (2008), Rao and Sharma (2009, 2011), Patel et al. 
(2011) and Chakrabarti (2016). The study area around Gankot lies in the Kumaon Himalaya in Pithoragarh 
district of Uttarakhand between latitudes 29° °3 ° °
rocks of the study area belong to the Inner Sedimentary Belt of Lesser Himalaya and form a part of the Mandhali 
Formation (Sor + Thalkedar Formation) of Lesser Kumaon Himalayan region (Valdiya, 1980: Fig. 1). The study 
area is located around north and north-western margin of Majhaon Danda hill (Elev. 1826m) dominantly 
consisted of carbonate rocks. The lithology belongs to Calc zone of Pithoragarh, as it is consisted dominantly of 
dolomitic limestone, limestone, slaty limestone and slate indicative of low grade regional metamorphism in the 
region. According to Valdiya (1980) the syncline is present between the Bhalpatal Dhar (Elev. 1941m) to 
Majhaon Danda (Elev. 1826m) which is well discernible between Balkot through Bisar to Paganna and Hureti. 
The rock types found in the study area during field survey are phyllitic limestone (argillaceous limestone), 
laminated limestone, grey coloured massive dolomitic limestone, slate and dolerite. The structural analysis has 
been carried out considering the geological structures as planar fabrics, linear fabrics and fold. The area has 
experienced at least three stages of ductile deformation under compressional tectonics causing development of 
three generation of folds and thus exhibiting a complex folded sequence of rocks. The aim of the present work 
however, is focused on analyzing the geometry of the mesoscopic folds found in the study area and flattening 
strain and shearing experienced by these folds. 

 

 

Fig. 2. Mesoscopic structures showing refolding in limestone (a and c) and slate (b) and shearing in limestone (d) of the study 
area 



 
Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019 21 

 

 

3. Analysis of fold profile geometry 

The study area around Gankot village in Pithoragarh district of Uttarakhand possesses complex but 
interesting structures:Fig. 1. The field observations are indicative that the entire area has undergone repeated 
phases of deformation as a result of multi-phased Himalayan orogeny resulting into an intricate system of 
superimposed folds, faults and fracture development at different scales:Fig. 2. In the study area although folds 
are present in all rocks at all scales from microscopic, mesoscopic to macroscopic levels, the mesoscopic folds 
have been chosen for geometrical analysis for convenience in the study. 

In order to geometrically analyze the fold in present study the folds have been traced from field photographs, 
field tracings and cut-and polished sections of the hand specimen samples. Cares have been taken so that the 
tracings as far as possible represent the profile section of the fold. These fold profiles along with their dip isogons 
have been presented in Fig. 3.  

 

 
 

Fig. 3. Dip isogons on the tracings of profile sections of folds from the study area. 
 
In order to analyze the geometry according to Ramsay (1967) the orthogonal thickness tα were measured 

from the limbs of each fold layer separately on the fold profile. The orth α were 
obtained by dividing tα with t0 ( α = tα/ t0), where α is the dip angle which is taken at interval of 10

o
 in present 

work. Fig. 4 α versus α diagram given 
by Ramsay (1967) for the geometric analysis of the folds. The plots are indicative that folds of the study area do 
not restrict themselves to a particular type of fold geometry rather, a large variation is observed in them. The 
folds in fact, show that all type of geometries suggested by Ramsay and Huber (1987) but in differing 
proportions. Therefore, in order to obtain a meaningful interpretation the results have been subjected to further 
statistical analysis and presented with help of a bar diagram in Fig. 5.  It can now be concluded with the help of 
Fig. 5 that the folds of the study area mostly exhibit class 3 fold geometry which accounts near 50% of all fold 
types, followed by 1B (27%) and 1A (15%). The Class 1C (7%) and class 2 (1%) fold geometries are less abundant. It 
was also observed that the most abundant classes (i.e. class3 and class 1B) receive good contributions from 
isogons from increasing α value. The high abundance of class 3 geometry suggests that major fold mechanism 
has been the differential compression in the area. However, other mechanism such as flexural folding (1B) and 
fold flattening (1C) are also important. The passive shear folding mechanism which is generally responsible for 
class 2 geometry is rare. 



 
22  Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019  
 

A. 

 

 

B. 

 

Fig. 4. 

α versus dip angle α for the fold profile geometry shown in A. L and R represent left and right limbs of the fold 
respectively, and 1, 2, 3 and 4 for their constitutive layers. 

 

 

4. Geometrical analysis of multilayered fold 

The folds of the study area generally multilayered therefore they have been studied as multilayered sequence 
too using the scheme given by Srivastava and Gairola (1999). The scheme utilizes the variation in the fold 
geometry of each constituting layers of a multilayered fold at a particular dip isogon (α) by obtaining the 

α) values. Fig. 6 represents the plot given by Srivastava and Gairola (1999), in which all 
the curve a, b, c, and d are originated from the origin point and separating the two different geometric class.   

if not, they are termed 

-
analogous, sub-analogous, sub-nonanalogous, nonanalogous, and strongly nonanalogous fold classes. The data 
obtained from the analyzed multilayered folds of the study area are plotted and given in Fig. 6. 

The multilayered folds of the study area (Fig.3) were treated according to Srivastava and Gairola (1999) and 
thereafter plotted in the their standard graph(Fig. 6). It has been found that the majority of the folds of the study 
area belong to the strongly non-analogous fold category. Fig. 6 reveals that the folds do not exhibit definite fold 
geometry and the plots are distributed in more than one class. Therefore, the fold data were once again analyzed 
to know their frequency in different classes and the analysis is presented with the help of bar diagram in Fig. 7.  
It reveals that though fold data fall in almost all the classes but majority of the folds belong to the strongly 
nonanalogous class. This indicates that the folds of the Gankot area do not have regular geometry in the 
multilayered sequence and the degree of variation is very high suggesting strong influence of multiple phased 
deformations on these folds. The great deviation from any consistent regular fold geometry may be the effects of 
folding and refolding which are often visible in the rocks of the study area: Fig. 2. 

 

 

Fig. 5. Bar Diagram showing frequency of different fold classes (Ramsay, 1967) in the study area. 



 
Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019 23 

 

 

Fig. 6. Variation in geometry of multilayered folds of the study area plotted in standard σn α) versus Dip angle α diagram (after 
Srivastava and Gairola, 1999); A, S, R, and L represents fold, antiform, synform, right limb and left limb respectively for folds  

(Fig.3).  

 

 

Fig. 7. Frequency distribution of mesoscopic multilayered folds classes (Fig.3& Fig. 6) of study area. 

 

5. Flattening and Shearing in Folds 

A buckle or flexure fold does not change the orthogonal thickness of the layer, therefore such folds exhibit 
class 1B geometry. However, if the folds are subsequently compressed the layers fail to maintain this thickness 
and they change their geometry from class 1B to 1C because of flattening. Thus a unit circle of 1B fold obtained 
by inverse thickness method (Lisle 1992) changes to an ellipse; the axial ratio of this ellipse gives the finite 
flattening strain ratio (Srivastava and Gairola 2003). The folds after their formation due to progressive 
deformation or subsequent co-axial deformation may undergo flattening. Sometimes the flattening may be 
associated with shearing also that may also be recognized by the method of Srivastava and Gairola (2003). Thus 
the method is often useful not only in partitioning out the flattening strain but it is also capable of detecting the 
sense of rotation by shearing.  In fold, the strain analysis has been done by drawing strain ellipse obtained by 

estimating flattening st
has been applied on the folds of the study area and a part of which is given in Fig. 8.  



 
24  Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019  
 

 
 

 

Fig. 8. Flattening strain estimation for fold layers (of fold no VII, Fig.3); Rs= Finite 2-D flattening strain ratio; β = Inverse Shear 
angle (β= -ψ); Shear strain γ = tanψ (after Srivastava and Gairola, 2003). 

 

 

A total of 67 limbs of the folded layers belonging to 10 different multilayered folds comprising of 3 to 5 layers 
have been analyzed and the results are presented in Table 1. The folds are widely distributed over the study area 
and it was observed that the finite two-dimensional flattening strain ratio (Rs) values range between 1 and 3.14 
with an average Rs value of 1.60. It suggested that at places the fold layers of the study area have remained 
unflattened (Rs = 1) while at other places they are subjected to high degree of flattening. As a multilayered unit 
the folds of the study area have shown Mean Finite Flattening Strain Ratio (Mean Rs) values from 1.06 to 2.28. 
Following Srivastava and Gairola (2003) a total of 64 limbs of the folded layers belonging to 10 different 
multilayered folds comprising of 3 to 4 layers have been analyzed for shear strain (γ) and the results are 
presented in Table 2. Representative analysis of a multilayered fold is given in Fig. 8 as well.  Table 2 reveals that 
shear strain is not uniformly distributed in the folded layers and it varies between -2.75 and +3.27.  The negative 
sign is indicative of anticlockwise and the positive sign is for clockwise sense of shearing. These extreme values 
of shear strain (γ) correspond to the shear angle (ψ) as high as -70

o
 to +73

o
 in the individual layers however the 

mean shear angle (ψ) remains ~18
o
 in clockwise direction. It was also observed that the different constituting 

layers of a single multilayered fold have shown positive and negative shear senses which indicate that shear 
strain have been developed and received differently by the individual layers due differing slippage among the 
constituting layers. The variation in amount of shear strain and sense may be attributed to differing 
compositions and other mechanical anisotropies of the constitutive layers of the fold. When analyzed as 
multilayered fold, the average shear strain (Mean γ, Table 2) were found to vary between -0.56 to +2.70 within 
an individual fold but the overall average of the 10 multilayered fold (+0.33) account for the low overall shearing 
of the folds which accounts for only 18

o
 of general overall shear angle (ψ). However there might be great 

fluctuation form this mean shear strain (Mean γ) of a multilayered fold and standard deviation may be as high as 
1.91. Therefore it seems that the shearing in the folded layers is mainly due to the slippage among different 



 
Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019 25 

 

constituting layers of the folds which is indicative that perhaps the dominant folding mechanism seems to be the 
flexure-shear mechanism (Twiss and Moores, 2007). 

 
Table 1 
Finite 2-D Flattening Strain Ratio (Rs) obtained from different multilayered folds from the study area.  

FOLD NO. Flattening Strain Ratio (Rs) MEAN Rs 
L1 L2 L3 L4 L5  

I 1.59 2.77 2 2.77 - 2.28 
IIA 1.47 1.11 1.11 1.92 - 1.4 
IIS 1.85 1.33 1.26 2 - 1.61 
III 1.6 1.81 1.75 - - 1.72 
IV 1.46 1 1.57 1.68 1.04 1.35 
VA 1.79 1.47 1.68 1.75 - 1.67 
VS 3.14 1.65 2.07 1.42 - 2.07 
VIA 1.31 2 1.87 1.47 1.47 1.62 
VIS 1.85 2.82 1.56 1.35 1.69 1.85 

VIIA1 1.39 1.56 1.71 1.47 - 1.53 
VIIA2 1.93 1.5 1.5 - - 1.64 
VIIS 1.75 1.53 2.23 - - 1.84 
VIIIA 1.71 1.19 1.39 - - 1.43 
VIIIS1 1.05 1.04 1.72 - - 1.27 
VIIIS2 1.67 1.8 1.48 - - 1.65 

IXA 1.4 1.53 1.67 - - 1.53 
IXS 1.05 1.05 1.07 - - 1.06 
X 1.17 1.17 1.18 1.18 - 1.18 

Average 1.60 

 

 

 

Table 2 

Shear Strain (γ) obtained from different layers of folds from the study area. 

 
 

6. Discussion and Conclusion 

Many workers have discussed about the Kumaon Himalaya pertaining to different aspects of structure and 
tectonics in this region (Bhattacharya, 2008; Valdiya and Pande, 2009; Joshi and Tiwari, 2009; Agarwal et al. 
2010, 2016; Agarwal and Sharma, 2011; Bhargava, 2011; Patel et al., 2007, 2011; Srivastava et al. 2011; Verma 
and Bhattacharya, 2011; Jain et al. 2012, 2016; Shah et al, 2012; Singh et al., 2012; Jade et al. 2014; Dubey 2014; 
Banerjee et al. 2015; Bhattacharya and Ahmed 2016)and their works have thrown much light on the tectonic 
evolution of the rocks of the region which are highly folded and tectonically much complex. The mesoscopic 
folds have been used by many workers for the analysis of the folding and the strain conditions (Dieterich and 

FOLD NO. SHEAR STRAIN (γ) Mean γ SD 

L1 L2 L3 L4 

I 1.43 1.73 -2.75 1 0.35 1.81 

II,A 1.8 0.12 0.12 2.75 1.20 1.13 

II,S 2.9 3.27 1.88 2.75 2.70 0.51 

III 0.14 -0.14 -0.18 - -0.06 0.14 

IV -2.75 0 0.09 -0.58 -0.81 1.15 

V,A 0.81 0.55 0.23 0.58 0.54 0.21 

V,S 1.11 1.73 1 -0.58 0.81 0.85 

VI,A 1.67 1.19 -0.84 0.36 1.59 1.09 

VI,S 2.75 -1.54 -1.73 -1.73 -0.56 1.91 

VII,A1 -0.18 0 -0.1 -0.27 -0.14 0.1 

VII,A2 -0.9 0.27 -0.42 - -0.35 0.48 

VII,S -0.34 -0.27 -0.73 - -0.45 0.2 

VIII,A -0.47 -0.36 -0.27 - -0.37 0.08 

VIII,S1 -0.21 0 1.19 - 0.33 0.62 

VIII,S2 -0.21 2.47 2.9 - 1.72 1.38 

IX,A -0.31 -0.09 0.18 - -0.07 0.2 

IX,S -0.84 -0.18 0 - -0.34 0.36 

X 0.27 0.3 -0.1 -0.1 0.09 0.21 

Average +0.33  



 
26  Lata, S. et al./ JGEET Sp Vol 04 No 02-2/2019  
 

Carter, 1969; Roberts and Strömgard, 1972; Hudleston, 1973; Sanderson, 1976; Bhattacharya, 1978; Hudleston, 

and Holst, 1984; Lisle, 1992; Bastida, 1993; Bastida et al., 2003; Srivastava, 1995, 2003; Srivastava and Gairola, 
2003). To unravel the complexities of the fold geometries significant work include those by Srivastava and Sinha 
(1987); Jain and Anand (1988); Srivastava et. al.(2011); Katiyar and Srivastava (2012) which have utilized the 
fold profiles of mesoscopic folds in Himalayan region. The present study area which belongs to the Thalkedar 
limestone unit of Mandhali Formation, Tejam Group of Lesser Himalaya, district Pithoragarh possesses 
complexly folded sequence of limestone and slate. On the basis of presence of microfossils, Tiwari and Pant 
(2009) consider the Gangolihat Limestone of Kumaon Himalaya as Neoproterozoic age. The folding in these 
Neoproterozoic rocks must have been developed in multiple phases during the Himalayan Orogeny in Tertiary. 
Patel et al. (2011) recognized four phases of deformation (D1 to D4) in the Higher Himalayan Crystallines of 
Kumaun Himalaya, which are responsible for complex geometries of the folds in the region. Analysis of fold 
geometry and strain in this region however, is very much lacking. In the present study our aim is to quantify the 
overall deformation status in terms of strain and shearing in the mesoscopic folds without differentiating the 
folds of different generations. Therefore, in the present work we have attempted not only the geometric analysis 
of the mesoscopic folds but the flattening strain conditions after their formation is also discussed. We have 
applied the schemes proposed by Srivastava and Gairola (1999 and 2003) for the folds of study area because this 
scheme allows the fold to be studied as multilayered sequence too. The study reveals that folds in study area 
belong to strongly non-analogous fold class of anisodeviatoric fold of Srivastava and Gairola (2003). Most of the 
folds of the study area however exhibit class 3 fold geometry which is indicative that thickness of the layers in 
limb portion is much less than those at the hinge zone. This may be due to the additive deformation caused by 
subsequent folding, refolding, flattening and shearing etc. after the first folds were formed. However the class 3 
geometry is next succeeded in abundance by class 1B geometry of Ramsay (1967) which reveals that a significant 
number of the folds in the study area have still maintained their orthogonal thickness perhaps because some of 
the layers were compositionally competent enough and were not significantly affected by later deformations.  
The subsequent deformations however, are arrested in folds in the comparatively less competent layers in the 
form of flattening strain and shearing which have been partitioned out by the method after Srivastava and 
Gairola (2003). The finite two-dimensional flattening strain ratio (Rs) value ranged between 1 and 3.14 with an 
average Rs value of 1.60 in individual folded layers however, in multilayered folds around Gankot area it varied 
between 1.06 and 2.28 which is suggestive of moderate flattening in the folds in general. The shear strains (γ) in 
folds have been found to vary between -2.75 to +3.27 with an average of +0.33. A very high degree of variation in 
shearing ranging about 70

o
 in both clockwise and anticlockwise directions has been detected in the folds of the 

study area. The shearing and strain patterns have also been examining by observing their amount and direction 
in the next above and below layers. The patterns are suggestive that the most dominant folding mechanism has 
been the flexure-shear for the folds of the study area. Flattening strain in these folds must have been overprinted 
obviously in subsequent deformations after the fold formation which might have modified the original shearing 
too. The possibility that the original shear patterns also get modified when the folds occur in the vicinity of a 
shear zone in the study area, cannot be ruled out. 

Acknowledgements 

The authors are thankful to the facilities provided by the Head as well as Coordinator CAS, Geology 
Department, Banaras Hindu University, Varanasi, India. RK is thankful for the RG National Fellowship. 

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	1. Introduction
	2. Geology of the area
	3. Analysis of fold profile geometry
	4. Geometrical analysis of multilayered fold
	5. Flattening and Shearing in Folds
	6. Discussion and Conclusion
	References