nach oben

Mechanics of Composite Materials

Erschienen in:

29.01.2020

Describing the Asymmetric Relaxation Spectra of Viscoelastic Materials and Dielectrics

verfasst von: O. G. Novozhenova

Erschienen in: Mechanics of Composite Materials | Ausgabe 6/2020

Einloggen

Aktivieren Sie unsere intelligente Suche, um passende Fachinhalte oder Patente zu finden.

search-config

KI-gestützte Suche

Aus

Abstract

In the first part of this survey, T. D. Shermergor’s works on the use of the confluent hypergeometric function of the first kind for describing asymmetric relaxation spectra are considered. The second part is devoted to the works of Soviet authors of the past (20th) century on this topic.

Vorheriger Artikel Optimum Position of Electrodes to Detect Delaminations in Composite Materials Using the Electric Resistance Change Method

Nächster Artikel Editorial Board

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Yu. N. Rabotnov, Creep of Structural Elements [in Russian], M., Nauka (1966).

J. D Ferry, Viscoelastic Properties of Polymers [Russian translation], M., Izd IL (1963).

Yu. N. Rabotnov, “Equilibrium of elastic media with an aftereffect,” Prikl. Matem. Mekh., 12, No. 1, 53-62 (1948).

T. D. Shermergor, “Rheological characteristics of the viscoelastic materials with an asymmetric relaxation spectrum,”Mekh. Tverd. Tela, No. 5, 73-83(1967). URL:http://imash.ru/netcat_files/file/matvienko%20stati/МТТ%205%2067%20Shermergor. pdf (reference date: 05.22.2019)

V. F. Listovnichii and T. D. Shermergor, “Creep of viscoelastic media with kernels of type of the confluent hypergeometric function,” Mekh. Tverd. Tela, No. 1, 136-141 (1969). URL: http://imash.ru/netcat_files/file/matvienko%20stati/SM_1_69.pdf (reference date: 05.22.2019)

V. F. Listovnichii and T. D. Shermergor, “Relaxation of stresses and creep of some linear viscoelastic media,” Mekh. Tverd. Tela, No. 4, 106-112 (1970). URL: http://imash.ru/netcat_files/file/matvienko%20stati/SM_4_70.pdf (reference date: 05.22.2019).

V. F. Listovnichii, Some problems of the mechanical and dielectric relaxation in non-uniform materials, Abstract of cand. thesis, Physical and Mathematical sciences, Kalinin (1970).

T. D. Shermergor, “Description of hereditary properties of materials by the superposition of ∋ operators,” Mekh. Deform. Tel. Konstr., M., Mashinostroenie, 528-532 (1975).

T. D. Shermergor, Elasticity Theory of Microheterogeneous Media. Ch. 8. “Effective characteristics of viscoelastic materials,” [in Russian] M., Nauka (1977).

10.

T. D. Shermergor, Some Laws of Energy Absorption by Steel at Compression, Abstract of cand. thesis, Physical and mathematical sciences, Tomsk (1956).

11.

T. D. Shermergor, “To the thermodynamical theory of relaxation processes,” Zhurn. Tekh. Fiz. 27, No. 3, 647-654 (1958).

12.

T. D. Shermergor, “On the influence of relaxation processes on the curve of plastic flow of metals,” Izv. Vuz. Chern. Metallurg., No. 3, 111-118(1958).

13.

T. D. Shermergor, “To the thermodynamical theory of elastic aftereffect,” Izv. Vuz. Fiz., No. 1, 78-85(1958).

14.

T. D. Shermergor, “On the strain rate dependence of stress,” Izv. Vuz. Fiz., No. 2, 125-129 (1958).

15.

T. D. Shermergor, “To the thermodynamical description of nonequilibrium processes,” Nauch. Dokl. Vyssh. Shkoli, Fiz. Mat. Nauki, No. 5, 147-150 (1958).

16.

T. D. Shermergor, “Cyclic deformation of viscoelastic bodies,” Izv. Vuz. Chern. Metallurg., No. 3, 63-72 (1959).

17.

T. D. Shermergor, “Calculating the function of relaxation times for the elastic aftereffect,” Fiz. Metall. Metalloved., 9, No. 2, 161-168 (1960).

18.

T. D. Shermergor, “Calculating the distribution functions of relaxation constants for viscoelastic bodies,” Izv. Vuz. Fiz., No. 3, 185-194 (1960).

19.

T. D. Shermergor, “Calculating the distribution functions of relaxation constants from dispersion of the real part of complex elasticity for viscoelastic bodies,” Izv. Vuz. Fiz., No. 1, 77-83 (1961).

20.

T. D. Shermergor, “On the symmetry of relaxation spectrum,” Тr. Novokuznetsk. Gos. Ped. Inst., Ser. Fiz. Mat., 4, 153 (1962).

21.

T. D. Shermergor and S. I. Meshkov, “To the description of the background of internal friction at torsional vibrations,” Fiz. Metall. Metalloved., 13, No. 6, 817-822 (1962).

22.

T. D. Shermergor and V. S. Postnikov, “Temperature relaxation in solids,” Relaxation phenomena in metals and alloys,” Тr. III Vsesoyuz. Konf., M., Metalurgizdat., 27-30 (1963).

23.

T. D. Shermergor, “To the phenomenological theory of internal friction,” Relaxation phenomena in metals and alloys,” Тr. III Vsesoyuz. Konf., M., Metalurgizdat., 33-39 (1963).

24.

T. D. Shermergor and S. I. Meshkov, “Phenomenological description of high-temperature internal friction,” Relaxation phenomena in metals and alloys,” Тr. III Vsesoyuz. Konf., M., Metalurgizdat., 46-52 (1963).

25.

S. I. Meshkov and T. D. Shermergor, “On the high-temperature internal friction at longitudinal vibrations,” Zhurn.Prikl. Mekh. Tekhn. Fiz., No. 3, 20-251963.

26.

S. I. Meshkov, G. N. Pachevskaja, and T. D. Shermergor “To the description of internal friction with the help of fractional-exponential kernels,” Zhurn. Prikl. Mekh. Tekhn. Fiz., No. 3, 103-106 (1966).

28.

T. D. Shermergor, “Problems of the Theory of Mechanical Relaxation in Solids, Abstract of Dr. thesis, Physical and mathematical sciences, М., (1966).

29.

T. D. Shermergor and S. I. Meshkov, “Linearization of equations of the nonlinear theory of dielectric relaxation,” Sb. Nauch. Tr. Probl. Mikroelektr., M., МIEТ, No. 5, 57-63 (1970).

30.

Yu. A. Rossikhin, “Reflections on two parallel ways in the progress of fractional calculus in mechanics of solids,” Trans. ASME. Appl. Mech. Rev., 63, January, 010701-12 (2010).CrossRef

31.

Е. S. Sinaiskii, “On the numerical realization of the function of a hereditary operator,” Prikl. Matem. Mekh., 42, No. 6, 1115-1122 (1978).

32.

S. L. Roginsky, M. Z. Kanovich, and M. A. Коltunov, High-Strength Fibreglasses [in Russian], M., Khimia (1979).

33.

V. D. Shtrauss and Kh. E. Slava, “Time integral characteristics of the four-parameter descriptions of relaxation processes,” Mech. Compos. Mater., No. 5, 621-626 (1979).

34.

V. D. Shtrauss, “Calculation of provisional heredity functions by means of inverse Laplace transformation,” Mech. Compos. Mater., No. 1, 126-148 (1980).CrossRef

35.

S. Gavril’yak and S. Negami, “Analysis of α -dispersion in some polymeric systems by the method of complex variables,” Transitions and Relaxation Phenomena in Polymers [Russian translation], M., Mir, (1968).

36.

G. A. Vanin, “To the basics of the theory of composite materials with a disordered structure,” Prikl. Mekh., 19, No. 3,9-18 (1983).

37.

G. A. Vanin, “New distribution functions in composite mechanics,” Prikl. Mekh., 20, No. 5,

38.

-31 (1984).

39.

G. A. Vanin and N. E. Stelikov, “Study of distribution of microspheres in spheroidal plastics,” Mech. Compos. Mater., No. 3, 263-267 (1985).CrossRef

40.

Yu. V. Suvorova and S. I. Alekseeva, “Nonlinear model of an isotropic hereditary medium in stress state,” Mech. Compos. Mater., 29, No. 5, 443-447 (1993).CrossRef

41.

Yu. V. Suvorova and S. I. Alekseeva, “Nonlinear hereditary model including temperature effects in various stress states,” Mech. Compos. Mater., 32, No. 1, 53-60 (1996).CrossRef

42.

O. G. Novozhenova, “On the use of confluent hypergeometric functions in the mechanics of CM,” Mater. of III Internat. Conf. on CM, (DFCMS-2018), IMASH, October 23-25, 84-86 (2018). URL:http://imash.ru/netcat_files/file/dumanskii/ Trud-DFCMS2018.pdf http://imash.ru/netcat_files/file/dumanskii/Trudi%20DFCMS2018%20 (в%20печать) .pdf (reference date: 05.22.2019)

Titel: Describing the Asymmetric Relaxation Spectra of Viscoelastic Materials and Dielectrics
verfasst von: O. G. Novozhenova
Publikationsdatum: 29.01.2020
Verlag: Springer US
Erschienen in: Mechanics of Composite Materials / Ausgabe 6/2020
Print ISSN: 0191-5665
Elektronische ISSN: 1573-8922
DOI: https://doi.org/10.1007/s11029-020-09853-x

Premium Partner

Marktübersichten

Die im Laufe eines Jahres in der „adhäsion“ veröffentlichten Marktübersichten helfen Anwendern verschiedenster Branchen, sich einen gezielten Überblick über Lieferantenangebote zu verschaffen.

Zur Marktübersicht

Springer Professional

Abstract

Bitte loggen Sie sich ein, um Zugang zu Ihrer Lizenz zu erhalten.

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Weitere Artikel der Ausgabe 6/2020

Optimum Position of Electrodes to Detect Delaminations in Composite Materials Using the Electric Resistance Change Method

Editorial Board

Yield Loci of Reinforced Plates Made from Rigidplastic Unequiresistant Materials Considering the Two-Dimensional Stress State in Fibers I. Unidirectional Reinforcement

The Buckling Behavior of Vacuum-Infused Open-Hole Unidirectional Basalt-Fiber Composites Experimental and Numerical Investigations

Spatial Buckling Modes of a Fiber (Fiber Bundle) of Composites with a [±45]2s Stacking Sequence Under the Tension and Compression of Test Specimens

Nonlinear Postbuckling of Eccentrically Oblique-Stiffened Functionally Graded Doubly Curved Shallow Shells Based on Improved Donnell Equations

Premium Partner

Marktübersichten