**S**

*tochastic Modeling and Applications*

**ISSN: 0972-3641**

**Vol. 25 No. 1 (January-June, 2021)**

(UNDER PREPARATION)

(UNDER PREPARATION)

**1. ***WRAPPED GENERALIZED SKEW NORMAL DISTRIBUTION *

**Author: C. SATHEESH KUMAR AND REEBA MARY ALEX**** **** **

Received: 28th August 2020
Revised: 30th September 2020 Selected: 26th October
2020

How to Cite: **Kumar, C. S. and Alex, R., 2021. Wrapped Generalized Skew Normal Distribution. Stochastic Modeling and Applications, 25(1).**

**2. ***A CERTAIN SUBCLASS OF UNIFORMLY CONVEX FUNCTIONS DEFINED BY LAMBDA OPERATOR*

**AUTHOR:**

**B. ELIZABETH RANI, R. N. INGLE, P.THIRUPATHI REDDY AND B. VENKATESWARLU**

*Received: 30th September 2020
Revised: 09th November 2020 Selected: 26th November
2020*

**How to Cite:**

**Rani, B., Ungle, R., Reddy, P. and Venkateswarlu, B., 2021. A Certain Subclass of Uniformly Convex Functions**

Defined by Lambda Operator. Stochastic Modeling and Applications, 25(1).

Defined by Lambda Operator. Stochastic Modeling and Applications, 25(1).

**3.****SOME APPLICATIONS OF UNIFORMLY CONVEX FUNCTIONS WITH NEGATIVE COEFFICIENTS**

DEFINED BY FRACTIONAL CALCULUS OPERATOR

DEFINED BY FRACTIONAL CALCULUS OPERATOR

**AUTHOR:**

**SANTOSH V. NAKADE, RAJKUMAR N. INGLE AND P.THIRUPATHI REDDY**

*Received: 27th December 2020 Revised: 19th January 2021 Selected: 23rd January 2021*

**How to Cite:**

**Santosh N, S., Ingle, R. and Reddy, P., 2021.**Some Applications Of Uniformly Convex Functions With Negative

Coefficients Defined By Fractional Calculus Operator

**. Stochastic Modeling and Applications, 25(1).**

**4.**

*SURVIVAL ANALYSIS FOR DIAGNOSING TUBERCULOSIS PATIENTS*

**AUTHOR:**

**SAKTHIVEL. E AND ANITHA. S**

*Received: 13th December 2020 Revised: 16th January 2021 Selected: 25th January 2021*

**How to Cite:**

*Sakthivel. E and Anitha. S.***, 2021.**

*Survival Analysis for Diagnosing Tuberculosis Patients***. Stochastic Modeling and**

Applications, 25(1).

Applications, 25(1).

*5.*

*NEW SUBCLASS OF ANALYTIC FUNCTIONS WITH NEGATIVE COEFFICIENTS DEFINED BY*

MITTAG-LEFFLER FUNCTIONMITTAG-LEFFLER FUNCTION

**AUTHOR:**

**Pasunoori Srinivasulu & V.Srinivas**

*Received: 11th January 2021 Revised: 12th*

*February*

*2021 Selected: 22nd*

*February*

*2021*

**How to Cite:**

*Srinivasulu, P. and Srinivas, V., 2021. New Subclass of Analytic Functions With Negative Coefficients Defined By*

Mittag- Leffler Function. Stochastic Modeling and Applications, 25(1).Mittag- Leffler Function. Stochastic Modeling and Applications, 25(1).