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  1.  

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    		$a Analysis of earth pressure at retaining walls reinforced with geosynthetics $f Jozef Vlček ... [et al.]
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    		$a Recent design methods of reinforced retaining walls are based on several approaches at the earth pressure determination. Newer methods are developed to bring the design model closer to real conditions. The monitoring of the structures reinforced with the geosynthetics but shows some anomalies at wall displacements and reinforcement loads. A series of real structure monitoring and numerical modelling was involved to verify the recent design methods. This paper represents the results of these analyses aimed at the earth pressure due to the backfill of the wall and at the stress distributions along the reinforcement
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    		$1 001 umb_un_cat*0257262 $1 010 $a 978-619-7105-08-7 $1 011 $a 1314-2704 $1 200 1 $a SGEM 2014 $d 14th GeoConference on science and technologies in geology, exploration and mining $e international multidisciplinary scientific geoconference SGEM 2014, 17-26 June 2014, Albena Bulgaria $e conference proceedings $h Vol. II $v S. 33-40 $1 205 $a 1. vyd. $1 210 $a Sofia $c STEF92 $d 2014 $1 710 11 $3 umb_un_auth*0266715 $a GeoConference on science and technologies in geology, exploration and mining $b international multidiciplinary scientific geoconference $d 14 $e Albena $f 17.-26.06.2014
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    		$3 umb_un_auth*0266727 $a earth pressure
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  2.  

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    		$a 10.1007/s00012-022-00769-2 $2 DOI
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    		$a 20220413d2022 m y slo 03 ba
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    		$a Canonical extensions of lattices are more than perfect $f Andrew P. K. Craig, Maria J. Gouveia, Miroslav Haviar
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    		$a In a paper published in 2015, we introduced TiRS graphs and TiRS frames to create a new natural setting for duals of canonical exten sions of lattices. Here, we firstly introduce morphisms of TiRS structures and put our correspondence between TiRS graphs and TiRS frames into a full categorical framework. We then answer Problem 2 from our 2015 paper by characterising the perfect lattices that are dual to TiRS frames (and hence TiRS graphs). We introduce a new subclass of perfect lattices called PTi lattices and show that the canonical extensions of lattices are PTi lattices, and so are ‘more’ than just perfect lattices. We illustrate the correspondences between classes of our newly-described PTi lattices and classes of TiRS graphs by examples. We conclude by outlining a direction for future research.
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    		$1 001 umb_un_cat*0307680 $1 011 $a 0002-5240 $1 011 $a 1420-8911 $1 200 1 $a Algebra Universalis $v Vol. 83, no. 2 (2022), pp. [1-17] $1 210 $a Basel $c Springer Nature Switzerland AG $d 2022
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  3.  

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    		$a 10.1515/jgth.2001.003 $2 DOI
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    		$a 20010614 1999slo0103
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    		$a eng
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    		$a On the point stabilizers of transitive groups with non-self-paired suborbits of length 2 $f Dragan Maručič, Roman Nedela
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    		$1 001 umb_un_cat*0329657 $1 011 $a 1435-4446 $1 200 1 $a Journal of Group Theory $v Vol. 4, no. 1 (2001), pp. 19-43 $1 210 $a Berlín $c Walter de Gruyter $d 2001
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    		$3 umb_un_auth*0036218 $a matematika $X mathematics
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  4.  

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    		$a aaa
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    		$a Public administration and development $v Vol. 24, no. 4 (2004)
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    		$a Hoboken $c John Wiley & Sons $d 2004
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    		$u https://archive.org/details/pub_public-administration-development $a Link na zdrojový dokument

  5.  

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    		$a 10.1016/j.fss.2013.07.024 $2 DOI
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    		$a eng
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    		$a NL
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    		$a Variation on a Poincaré theorem $f Beloslav Riečan
    463
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    		$1 001 umb_un_cat*0290820 $1 011 $a 0165-0114 $1 011 $a 1872-6801 $1 200 1 $a Fuzzy Sets and Systems $v Vol. 232 (2013), pp. 39-45 $1 210 $a Amsterdam $c Elsevier B.V. $d 2013
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    		$3 umb_un_auth*0134417 $a Poincaré $b Jules Henri $f 1854-1912
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    		$3 umb_un_auth*0160397 $a Poincaré recurrence theorem
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  7.  

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