The title speaks for itself: How to convert IEEE11073 16bit SFLOAT to simple float in Java?

You can use bit shifting. extract the sign, exponent and mantissa and shift these so they are in float format. You may need to correct for Infinity and NaN. 


IEEE11073 is not in public domain but you can find suffcient information in bluetooth personal health profiles. Google up with full spec# 110732060. Following is copy paste from a bluetooth personal health transcoding paper:



This 11073 library has C code that does that: https://github.com/signove/antidote/blob/master/src/util/bytelib.c Should not be difficult to convert to Java.
The boilerplate code:



Try searching for "Personal Health Devices Transcoding_WP_V11" and it will lead you to a document from the Bluetooth Special Interest Group. In the 25 Oct 2011 / V11r00 version of the document, section 2.2 "TRANSCODING BLUETOOTH CHARACTERISTICS TO 11073 ATTRIBUTES" gives a detailed explanation and examples of how to deal with 1107320601 FLOAT (32 bit) and SFLOAT (16 bit) numbers. The current URL of this document is https://www.bluetooth.org/docman/handlers/downloaddoc.ashx?doc_id=242961 Note that this is likely the same document Petri P. is referencing above. 


I can't find any float specification associated with IEEE 11073, you probably mean a Half precision float (sometimes also called Minifloat). The format is described sufficiently in Wikipedia to easily convert it into a normal float. Basically, you split it into the 3 fields (sign, exponent, mantissa). The sign does not need conversion, just needs to be shifted to the correct position. Then check the exponent if its MIN or MAX value, handle special cases (Inf, NaN, subnormals/denormalized). Otherwise just correct the bias of the exponent and shift to correct position. For the mantissa, add as many zeros to the right as required. Finally put everything together into an int and use Float.intBitsToFloat(bits) to convert the bits into a normal java float. Conversion from float works almost the same, only with the additional pitfalls of rounding, overflow and underflow. 

