FRINK Linked Data Fragments server

Matches in SemOpenAlex for { <https://semopenalex.org/work/W4292622431> ?p ?o ?g. }

• W4292622431 endingPage "245" @default.
• W4292622431 startingPage "225" @default.
• W4292622431 abstract "This paper mainly considers the (2+1)-dimensional Bogoyavlenskii–Kadomtsev–Petviashvili equation describing propagation dynamics of nonlinear waves appearing in physics, biology and electrical networks. A simple method to derive the multiple lumps and lump molecules is proposed by means of the solutions of Grammian form and polynomial functions. The interaction dynamical behaviors of the lumps and lump molecules are analyzed with the aid of numerical simulation. The interaction solutions including lumps, lump molecules and kink solitons are obtained, where the lumps can be emitted and absorbed by solitons. The phenomenon that one lump wave exchanges between two bound solitons is presented. A special Grammian τ -function is employed to construct the lump chain. Based on an analytical method related to dominant domain, we systematically analyze the interactions between lump chain and solitons. The lump chain can be emitted by a soliton and then absorbed by other solitons when the parameter is in a certain range. A large number of new solutions obtained in this paper are helpful to study the wave phenomena existing in the theory of water wave, soliton, optical fiber communication and other relevant scientific fields. • A simple method to derive the multiple lumps and lump molecules is proposed. • The lump chain of the BKP equation is constructed via a special Grammian τ -function. • A new analytical method is employed to analyze the interaction dynamical behaviors." @default.
• W4292622431 created "2022-08-22" @default.
• W4292622431 creator A5023763385 @default.
• W4292622431 creator A5032813285 @default.
• W4292622431 creator A5052221267 @default.
• W4292622431 date "2022-10-01" @default.
• W4292622431 modified "2023-09-29" @default.
• W4292622431 title "Lump and interaction dynamics of the (2+1)-dimensional Bogoyavlenskii–Kadomtsev–Petviashvili equation" @default.
• W4292622431 cites W1957700919 @default.
• W4292622431 cites W1990211967 @default.
• W4292622431 cites W2017037907 @default.
• W4292622431 cites W2026923035 @default.
• W4292622431 cites W2029403532 @default.
• W4292622431 cites W2031847772 @default.
• W4292622431 cites W2049465333 @default.
• W4292622431 cites W2063527260 @default.
• W4292622431 cites W2225838220 @default.
• W4292622431 cites W2467299677 @default.
• W4292622431 cites W2752913488 @default.
• W4292622431 cites W2790560616 @default.
• W4292622431 cites W2810368051 @default.
• W4292622431 cites W2883519241 @default.
• W4292622431 cites W2917820707 @default.
• W4292622431 cites W2934070062 @default.
• W4292622431 cites W3002026576 @default.
• W4292622431 cites W3005210642 @default.
• W4292622431 cites W3014001436 @default.
• W4292622431 cites W3022398366 @default.
• W4292622431 cites W3035687402 @default.
• W4292622431 cites W3095941015 @default.
• W4292622431 cites W3105263763 @default.
• W4292622431 cites W3114626062 @default.
• W4292622431 cites W3146433695 @default.
• W4292622431 cites W3176084428 @default.
• W4292622431 cites W3177548255 @default.
• W4292622431 cites W3187674031 @default.
• W4292622431 cites W3195527128 @default.
• W4292622431 cites W3196878849 @default.
• W4292622431 cites W3204433046 @default.
• W4292622431 cites W3217542190 @default.
• W4292622431 cites W4200588025 @default.
• W4292622431 cites W4283743765 @default.
• W4292622431 cites W4287377707 @default.
• W4292622431 cites W4293076930 @default.
• W4292622431 doi "https://doi.org/10.1016/j.cjph.2022.08.012" @default.
• W4292622431 hasPublicationYear "2022" @default.
• W4292622431 type Work @default.
• W4292622431 citedByCount "4" @default.
• W4292622431 countsByYear W42926224312023 @default.
• W4292622431 crossrefType "journal-article" @default.
• W4292622431 hasAuthorship W4292622431A5023763385 @default.
• W4292622431 hasAuthorship W4292622431A5032813285 @default.
• W4292622431 hasAuthorship W4292622431A5052221267 @default.
• W4292622431 hasConcept C121332964 @default.
• W4292622431 hasConcept C121864883 @default.
• W4292622431 hasConcept C129747778 @default.
• W4292622431 hasConcept C145912823 @default.
• W4292622431 hasConcept C158622935 @default.
• W4292622431 hasConcept C159785203 @default.
• W4292622431 hasConcept C24890656 @default.
• W4292622431 hasConcept C33923547 @default.
• W4292622431 hasConcept C37914503 @default.
• W4292622431 hasConcept C62520636 @default.
• W4292622431 hasConceptScore W4292622431C121332964 @default.
• W4292622431 hasConceptScore W4292622431C121864883 @default.
• W4292622431 hasConceptScore W4292622431C129747778 @default.
• W4292622431 hasConceptScore W4292622431C145912823 @default.
• W4292622431 hasConceptScore W4292622431C158622935 @default.
• W4292622431 hasConceptScore W4292622431C159785203 @default.
• W4292622431 hasConceptScore W4292622431C24890656 @default.
• W4292622431 hasConceptScore W4292622431C33923547 @default.
• W4292622431 hasConceptScore W4292622431C37914503 @default.
• W4292622431 hasConceptScore W4292622431C62520636 @default.
• W4292622431 hasFunder F4320321001 @default.
• W4292622431 hasFunder F4320321884 @default.
• W4292622431 hasLocation W42926224311 @default.
• W4292622431 hasOpenAccess W4292622431 @default.
• W4292622431 hasPrimaryLocation W42926224311 @default.
• W4292622431 hasRelatedWork W2005416445 @default.
• W4292622431 hasRelatedWork W2026168617 @default.
• W4292622431 hasRelatedWork W2043930649 @default.
• W4292622431 hasRelatedWork W2053057910 @default.
• W4292622431 hasRelatedWork W2060477245 @default.
• W4292622431 hasRelatedWork W2070981731 @default.
• W4292622431 hasRelatedWork W2084143801 @default.
• W4292622431 hasRelatedWork W2089074995 @default.
• W4292622431 hasRelatedWork W3102427995 @default.
• W4292622431 hasRelatedWork W4320000412 @default.
• W4292622431 hasVolume "79" @default.
• W4292622431 isParatext "false" @default.
• W4292622431 isRetracted "false" @default.
• W4292622431 workType "article" @default.