DOI : 10.17577/IJERTV3IS041857
- Open Access
- Total Downloads : 754
- Authors : Piyush C. Dalsania, Solanki Neha A. , Hiren J. Kathiriya
- Paper ID : IJERTV3IS041857
- Volume & Issue : Volume 03, Issue 04 (April 2014)
- Published (First Online): 02-05-2014
- ISSN (Online) : 2278-0181
- Publisher Name : IJERT
- License:
This work is licensed under a Creative Commons Attribution 4.0 International License
Analysis of Koch Snowflake Fractal Antenna for Multiband Application
Solanki Neha A.
Student, Dept. of ECE
-
K University Rajkot, India
Piyush C. Dalsania
Lecturer, Dept. of ECE
Dr. J. N. Mehta Govt. Polytechnic Amreli, India
Hiren J. Kathiriya
Asst. Prof., Dept. of ECE
-
K University Rajkot, India
Abstract This paper discusses the Koch snowflake behavior of the fractal antenna. The antenna has been designed for increasing outer perimeter of triangular shape patch by using self-similarity property and analyzed performance on multiband .There are number of example of self-similarity and space filling property of fractal antenna. We are examining number of iteration by the designing Koch snowflake for different resonant frequency.
Keywords fractal antenn; iterative method; multi band;
-
INTRODUCTION
The Koch snowflake it became an important sample of fractal set. The objective of this paper is to be design and, simulate Koch snowflake fractal antenna. The behavior and properties of an antenna are investigated. Multiband operation is becoming increasingly popular in several practical applications including next-generation wireless terminals. Fractals antennas that are small in size and simple in structure are typically demanded for such applications [1]. Fractals antennas are widely preferred for wireless communication systems as they are of small size, light weight, low profile, low cost, and are easy to fabricate and assemble [2]. The Koch snowflake geometry drew the attention of researchers as it is smaller than other patch geometries [3].
-
GEOMETRY OF KOCH SNOWFLAKE
-
Koch Snowflake
Fractal investigated in this study is based on a Koch snowflake. Comparisons can be drawn here between the Periodic Patterned designs highlighted in fig. (1), it was known as a Koch snowflake fractal. It originates from a plain square patch and subsequent iterations produce a cross-like fractal patch with ever more fine details at its edges such a design has several parameters which can be varied such as the depth and size of the removed segments [3].
Fig. 1. Basic Steps construction of a Koch snowflake fractal
Fig. 2. Design Steps construction of a Koch snowflake fractal
-
Self-Similarity Design
As shown in Fig. (2) Increasing outer perimeter of triangular patch according to the fractal formula of regular self-similarity pattern.
-
-
ANTENNA DESIGN
Ansoft Corporation
7090
.1806
9.
11
1706
3110
2676
7.
8.
9.
Name X Y
koch_1
Curve Info
HFSSDesign1
Many variation are possible with square size of patch antenna dimension As value changes as well as fractal steps iteration factor [3]. Here we take 1/3 iteration factor with dimension A= 9cm. Here we describe up to 4 iteration step are Koch fractal geometry [4].
The length of the boundary of S (n) at the nth iteration of the construction is 3*(4/3) ^n*s, where s denotes the length of each side of the original equilateral triangle [5]. Therefore the Koch snowflake has a perimeter of infinite length
The area of S (n) is
m1
-2.00 m2
m3
.00 m4
m5
-4
dB(S(WavePort1,WavePort1))
-6.00 m6
m7
-8.00
-10.00
-12.00
-14.00
-16.00
-18.00
–
–
–
15.7
18.6
10.6
420
584
818
Se
d tup1
B(S(
: Sw
Wave eep1
Port1
,Wav
ePor
t1))
–
–
13.2
16.0
439
857
–
–
15.9
17.7
546
740
.4682
.0502
12
14
m3
m4
m
1
m5
m2
7.00 8.00 9.00 10.00 11.00 12.00
Freq [GHz]
3s2 n 3 4k1
Fig. 4. Iteration -1 of Koch snowflake Fractal Antennas Return Loss
4 1 9k
k 1
B. Simulation Result For Iteration 2
Letting n go to infinity shows that the area of the Koch
snowflake is 2 3s2 .
5
Substrates Material R. T. duroid epoxy having permittivity (r) of 4 Dimension: 110*100*1.5 mm Patch Design shapes changes according to fractal variation A=9 cm Feeding: Commercial coaxial dimension used and feeding position center of the patch.
-
EXPERIMENTAL RESULT AND SIMULATION
A. Simulation Result For Iteration 1
Simulation result of individual iteration step by step with S11 (Return loss in dB), VSWR radiation pattern and reading tables
The structure of Koch snowflake fractal antenna with first iteration is as follows and on simulating the above structure with the help of Ansoft HFSS, the following results were obtained.
Fig. 5. Iteration -2 of Koch snowflake Fractal Antenna
Y
-25.1880
oraXtion
7.0970
koch_2
,Wav
Port1
Wave
B(S(
d
0
2.186
-1
582
8.4
Curve Info
t1))
ePor
HFSSDesign1
m2
AnNsaomfteCorp
m1
m3 9.8194 -13.9347
m4 11.5853 -14.2963
-5.00
dB(S(WavePort1,WavePort1))
-10.00
-15.00
-20.00
-25.00
Se
tup1
: Sw
eep1
m2
m3
m4
m1
7.00 8.00 9.00 10.00 11.00 12.00
Freq [GHz]
Fig. 6. Iteration -2 of Koch snowflake Fractal Antennas Return Loss
Fig. 3. Iteration -1 of Koch snowflake Fractal Antenna
-
Simulation Result For Iteration 3
Fig. 7. Iteration -3 of Koch snowflake Fractal Antenna
TABLE I.
AnNsaomfteCorporaXtion Y
koch_3
Iteration
Antenna Parameters
Resonant freq. (GHz)
VSWR
Return
Loss (dB)
Peak gain
Peak Directivity
1st
7.17
1.4
-15
5.17
4.29
8.31
1.26
-18
5.97
5.54
11.18
1.3
-16
1.05
4.69
2nd
7.09
1.11
-25
17.65
6.85
8.45
1.65
-12
0.80
4.79
9.8
1.5
-13
1.59
8.05
11.58
1.47
-14
4.39
14.86
3rd
6.80
1.14
-23
12.63
6.38
8.23
1.17
-22
2.96
6.94
9.12
1.04
-32
6.91
16.8
10.33
1.17
-21
2
8.73
10.88
1.11
-25
1.60
5.95
HFSSDesign1
m1 6.8027 -23.5206
m2 8.2375 -22.0532
m3 9.1204 -32.3374
Curve Info dB(S(WavePort1,WavePort1))
Setup1 : Sw eep1/p>
-m54.00
10.3344 -21.8006
m5 10.8863 -25.4495
dB(S(WavePort1,WavePort1))
-10.00
-15.00
-20.00
m2 m4
-
-
CONCLUSION
-
-
The resonant frequency increases with increase in the number of iterations. The multiband behavior is obtained as the numbers of iterations are increased .The return losses
m1
-25.00
-30.00
m5 improve as the number of iterations increase. The bandwidth of the antenna gets increased too with increase in the number
m3 of iterations. Improvement in VSWR is also observed with
6.00 7.00 8.00 9.00 10.00 11.00
Freq [GHz]
Fig. 8. Iteration -3 of Koch snowflake Fractal Antennas Return Loss
Fig. 9. E-Field Distribution of Koch snowflake Fractal Antenna
Simulation results of various iteration steps shown on above figures. Incremental properies of koch snowflake gives increasing in resonanant frequency observed result shown in table 1.
increase in iterations. The fractal geometry effect on patch antenna has been analyzed. This Koch snowflake antenna is a good example of the properties of fractal incremental boundary patch antennas. As the fractal iteration increases, perimeter of patch increases and effective area of antenna increases with improve multiband application. . The radiator is now resonant at more frequencies. It gives multiband properties to fractal geometry antenna with directive patterns. This behavior is obtained with a coaxial feeding scheme. So, fractal boundary patch antennas are an interesting replacement in the multiband antenna with broadside radiation patterns and with efficient directivity. This geometry offers numerous variations in dimension and design, hence gives wide scope for commercial applications.
REFERENCES
-
Mandelbrot B.B., The Fractal Geometry of Nature, W. H. Freeman,
New York, 1983
-
R Garg, P. Bhartia, I. Bahl, and A. Ittipiboon, Microstrip Antenna Design Handbook, Artech House, Norwood, MA, 2001.
-
K.J. Vinoy, Jose K. Abraham, and V.K. Varadan, Fractal Dimension and Frequency Response of Fractal Shaped Antennas, 2003 IEEE
-
Puente C., Romeu J., Pous R., Cardana A., On the behavior of the Sierpinski multiband antenna, IEEE Trans. on Antennas and Propagation, Vol. 46, pp. 517- 524, 1998
-
Lee. Y., Yeo. J., Mittra R., Ganguly S. and Tenbarge J., Fractal and Multiband Communication Antennas, IEEE Conf. on Wireless Communication Technology, pp. 273-274, 2003.