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This paper discusses the design considerations and practical constraints for wireless sensor placement in order to achieve reliable and efficient data collection. It includes case studies on ecological wireless sensor networks and explores regular deployments, ad-hoc wireless networks, and design goals for deployment. The results highlight the benefits of hexagonal and triangular deployments and the use of sparse grids. The paper also discusses the importance of sampling gradients and quantifying them for effective data collection.
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Wireless Sensor Placementfor Reliable and Efficient Data Collection Edo Biagioni and Galen Sasaki University of Hawaii at Manoa
Overview • Wireless Sensor Networks • Case study: an ecological wireless sensor network • Design Considerations • Regular Deployments • Linear and other arrangements
Sensor Networks are Useful • Ecological study: under what conditions does the endangered species thrive? • Knowing the environment aids in setting goals or controlling processes • Many applications, including ecological, industrial, and military
Ad-hoc Wireless Networks • Low-power operation • Range-limited radios • Ad-hoc networking: each node forwards data for other nodes • Data may be combined en route
Wireless Sensor Network Design • How densely must we sample the environment? • What is the radio communications range? • How much reliability do we have, and how does it improve if we add more units? • How many units can we afford?
The PODS project at the University of Hawaii • Ecological sensing of Rare Plant environment • Temperature, sunlight, rainfall, humidity • High-resolution images • Kim Bridges, Brian Chee
Intensive deployment where the plant does grow Interested also in where the plant does not grow Connection to the internet is also a line of sensors Pod placement Sub-region
Practical Constraints • Higher radios have more range • Camouflage • Plant densities may vary • Different units may have different sensors • Ignored in this talk
Design Goals for Deployment We are given a 2-dimensional square region with total area A • Minimize the maximum distance between any point in A and the nearest sensor • Keep the distance between adjacent sensors less than r • Measure point values, compute gradients and significant thresholds
Design Considerations • Financial and other constraints often limit the total number of nodes, N • Failure of individual nodes should not disable the entire network • Reducing the transmission range improves the energy efficiency
Square, triangular, or hexagonal tiles Nodes must be within range r of their neighbors Sampling distance δ Degree 4, 6, or 3 provides redundancy Which is best? (b) Triangle tile a (a) Square tiles (c) Hexagon tile Regular Deployments
Computing with N, r, δ • Standard formulas for tile area (α) and for distance to the center of the tile • Distance to center < δ • Distance between nodes < r • Each node is part of c = (6, 4, or 3) tiles • N = (A/α)/c, where A/α is the number of tiles
Main Results for Regular Grids • N is proportional to the surface area of A • if r < δ, hexagonal deployment minimizes N, and N is inversely proportional to r2 • If δ < r, triangular deployment minimizes N, and N is inversely proportional to δ2 • Triangular, square, or hexagonal are within a factor of two of each other
If r < δ, we can reduce the number of nodes by going to sparse grids (sparse meshes) Communication distance remains small the number of nodes may drop substantially 3 nodes per side, s=3 Sparse Grids S=3
Main Results for Sparse Grids • Communication radius r, tile side a = r * s • N is inversely proportional to a and to r • The degree of most nodes is two, so reliability is reduced – the same as for linear deployments
1-Dimensional Deployment • Many common applications: along streams, roads, ridges • Requires relatively few nodes • With the least number of nodes for a given r, network fails if a single node fails • How well can we do if we double the number of nodes?
Paired Inline Protection against node failures r r
Paired and Inline Performance • For inline, two successive node failures disconnect the network • For paired, failure of the two nodes of a pair disconnects the network • The former is about twice as likely
Sampling a Gradient • If we know the gradient, a linear deployment is sufficient • A gradient can be computed from three samples in a triangle • Variable gradients need more and longer baselines, as do threshold determinations • Grids and sparse grids measure gradients well
Quantifying a gradient The differences between pairs of samples help determine the gradient
The ultimate sparse grid: a circle Tolerates single node failures Even sampling in all directions Lines outward from the center: a star Center is well covered Star-3, Star-4, Star-5, Star-m Minimizing the number of nodes
Summary • Many regular deployments • Generally, N and r are given, sampling distance is allowed to vary • Tradeoff between N and redundancy: sparse grids allow large sampling distance • Lines, circles, stars are optimal when N is small, can provide information about gradients
Acknowledgements • Kim Bridges • Brian Chee and many students on the Pods project, including Michael Lurvey and Shu Chen • DARPA (Pods funding) • Hawaii Volcanoes National Park
