On the complex oscillation of y′′ + (ez − K)y = 0 and a result of Bank

Yik Man Chiang

doi:10.1142/9789814533232_0010

On the complex oscillation of y′′ + (ez − K)y = 0 and a result of Bank

Yik Man Chiang^*

^*Corresponding author for this work

Department of Mathematics

Research output: Contribution to conference › Conference Paper › peer-review

Abstract

Bank, Laine and Langley showed that when a solution of y″ + (ez — K)y = 0 has a finite exponent of convergence on its zero-sequence, then K = (2n + 1)2/16, where n is a non-negative integer. We give a refinement of their result by using a different approach, which allows us to consider another application.

Original language	English
Pages	125-134
DOIs	https://doi.org/10.1142/9789814533232_0010
Publication status	Published - Feb 1995
Event	Proceedings of the Conference Computational Methods and Function Theory 1994 - Duration: 1 Feb 1995 → 1 Feb 1995

Conference

Conference	Proceedings of the Conference Computational Methods and Function Theory 1994
Period	1/02/95 → 1/02/95

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10.1142/9789814533232_0010

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title = "On the complex oscillation of y′′ + (ez − K)y = 0 and a result of Bank",

abstract = "Bank, Laine and Langley showed that when a solution of y″ + (ez — K)y = 0 has a finite exponent of convergence on its zero-sequence, then K = (2n + 1)2/16, where n is a non-negative integer. We give a refinement of their result by using a different approach, which allows us to consider another application.",

author = "Chiang, \{Yik Man\}",

year = "1995",

month = feb,

doi = "10.1142/9789814533232\_0010",

language = "English",

pages = "125--134",

note = "Proceedings of the Conference Computational Methods and Function Theory 1994 ; Conference date: 01-02-1995 Through 01-02-1995",

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AU - Chiang, Yik Man

PY - 1995/2

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N2 - Bank, Laine and Langley showed that when a solution of y″ + (ez — K)y = 0 has a finite exponent of convergence on its zero-sequence, then K = (2n + 1)2/16, where n is a non-negative integer. We give a refinement of their result by using a different approach, which allows us to consider another application.

AB - Bank, Laine and Langley showed that when a solution of y″ + (ez — K)y = 0 has a finite exponent of convergence on its zero-sequence, then K = (2n + 1)2/16, where n is a non-negative integer. We give a refinement of their result by using a different approach, which allows us to consider another application.

UR - https://openalex.org/W2793557287

U2 - 10.1142/9789814533232_0010

DO - 10.1142/9789814533232_0010

M3 - Conference Paper

SP - 125

EP - 134

T2 - Proceedings of the Conference Computational Methods and Function Theory 1994

Y2 - 1 February 1995 through 1 February 1995

ER -

On the complex oscillation of y′′ + (ez − K)y = 0 and a result of Bank

Abstract

Conference

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